Answer:
The water level rises at 11.76 [tex]ft^{2} /s[/tex]
[tex]h=\sqrt{3/2} s[/tex] let be h: height and s: side of an equilateral triangle
Explanation:
The picture shows a diagram of the situation, first we have to determine the height of the trough as follows:
With the Pytagorean Theorem we can find out that:
[tex]h^{2} =s^{2} -s^{2} /4 =\sqrt{3} /2 s[/tex]
Then, the area of an equilateral triangle, as any triangle, is a half of its base times its height:
[tex]A=\frac{1}{2} hs=\frac{1}{2} \frac{\sqrt{3} }{2} s^{2} =\frac{\sqrt{3} }{4} s^{2}[/tex]
Replacing values, we have:
[tex]A=1.73ft^{2}[/tex]
That is the total area of the trough, but the problem specifies that it has been filled until 0.5 ft. Therefore, we have to find the cross section area of the water flow by substracting the total area minus the unfilled area of the trough:
[tex]h_{u}: height of the unfilled triangle\\s_{u} : side of the unfilled triangle\\A_{u}: area of the unfilled triangle\\h_{u}=\sqrt{3} -0.5 =1.23\\s_{u}= \frac{2}{\sqrt{3} } 1.23=1.42\\A_{u}=\frac{\sqrt{3} }{4} 1.42^{2} =0.87ft^{2} A_{u}[/tex]
Then, the cross section area of water flow is
[tex]A_{s} =1.73ft^{2} -0.87ft^{2} =0.85ft^{2}[/tex]
Finally, to determine the speed of water flow at this point we solve for v, the flow formula:
[tex]Q: water flow\\v: speed\\Q=vA\\v=Q/A =\frac{10ft^{3}/s }{0.85ft^{2} } =11.76 \frac{ft^{2}}{s}[/tex]
